Nonlinear travelling periodic waves for the Euler equations in three-layer flows

Xin Guan, Alex Doak, Paul Milewski, Jean-Marc Vanden-Broeck

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Abstract

In this paper, we investigate periodic travelling waves in a three-layer system with the rigid-lid assumption. Solutions are recovered numerically using a boundary integral method. We consider the case where the density difference between the layers is small (i.e. a weakly stratified fluid). We consider the system both with and without the Boussinesq assumption to explore the effect the assumption has on the solution space. Periodic solutions of both mode-1 and mode-2 are found, and their bifurcation structure and limiting configurations are described in detail. Similarities are found with the two-layer case, where large-amplitude solutions are found to overhang with an internal angle of. However, the addition of a second interface results in a richer bifurcation space, in part due to the existence of mode-2 waves and their resonance with mode-1 waves. New limiting profiles are found.

Original languageEnglish
Article numberA12
Number of pages25
JournalJournal of Fluid Mechanics
Volume981
Early online date19 Feb 2024
DOIs
Publication statusPublished - 25 Feb 2024

Funding

X.G. would like to acknowledge the support from the Chinese Scholarship Council (csc no. 202004910418). A.D. is funded by the EPSRC National Fellowship in Fluid Dynamics (EP/X028607/1).

FundersFunder number
EPSRC National Fellowship in Fluid DynamicsEP/X028607/1
China Scholarship Council202004910418

    Keywords

    • waves/free-surface flows

    ASJC Scopus subject areas

    • Condensed Matter Physics
    • Mechanics of Materials
    • Mechanical Engineering
    • Applied Mathematics

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